" Mathematics " explains the Riemann hypothesis in the simplest way ( 2 ) Golden Key - Riemann ζ function Gauss discovered the prime number theorem in the late 19th century , i.e. in 1000 consecutive integers

"Mathematics" explains the Riemann hypothesis in the simplest way (2) The Golden Key-Riemann ζ function

Gauss discovered the prime number theorem in the late 19th century, which states that half of 1,000 consecutive integers are prime. This is one of the most important theorems in mathematics. Gauss also discussed Legendre's conjecture in correspondence with astronomer Johann Franz Enck. Later, Euler proved the answer to the Basel question and gave detailed calculations for even and odd numbers. Riemann proposed the Riemann zeta function, which has a value only when s is greater than 1 and diverges for negative numbers. Euler proved that this series is convergent for any number whose s is greater than 1. This issue remains unresolved to this day.